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CP Probability and Statistics 1st Semester 4th Period Deitra Lynn Clegg Room 231 843-573-1201 ext: 1231 [email protected] Textbook: McGrawHill-Elementary Statistics: A Step by Step Approach Additional Resources: Students Study Guide TI-Nspire Calculator Mrs Clegg Wiki page at http://wahsclegg.wikispaces.com/ After school tutoring Course Description Probability, Statistics, and Data Analysis is a course in which students learn the fundamental principles of probability and statistics and apply these principles to data analysis. Students are expected to utilize scientific calculators, graphing calculators, and/or computer software throughout the year. Students will: work with a set of data to perform statistical analyses and summarize the results; examine ways to organize and display data to draw conclusions about relationships that may exist in the data set; describe and summarize data numerically using central tendency, variation, and position statistics; describe and summarize data numerically using distributions; utilize statistical applications to solve a wide variety of problems from agriculture, biology, business, economics, education, psychology, engineering, medicine, sociology, and computer sciences; use counting methods and probability formulas to evaluate the likelihood of events occurring; and apply probability and statistical tests as decision-making tools in hypothesis-testing applications. Course Outline I. Foundations of data analysis. A. Differentiate between descriptive and inferential statistics. B. Identify and classify variables. 1. Discrete or continuous. 2. Categorical or quantitative. C. Identify and classify methods of data collection. 1. Identify basic sampling techniques. Random, Systematic, Stratified, Cluster. 2. Discuss the advantages and disadvantages of various sampling techniques. 3. Distinguish among surveys, observational studies, and controlled experiments. 4. Recognize the method of data collection used to gather data from a given statistical study and evaluate the legitimacy of conclusions about the population based on the sample(s) studied. 5. Identify and discuss bias factors (e.g., voluntary response, convenience). D. Distinguish between statistic and parameter. . II. Univariate data displays. A. Determine an appropriate data display, and construct the display. 1. Frequency distributions. a. Categorical frequency distribution (Pareto chart). b. Histogram. c. Frequency polygon. d. Cumulative frequency distribution (ogive). III. IV. 6. Time series plot. 7. Stem plot (stem-and-leaf). a. Standard. b. Back-to-back (to compare two data sets with common stems). c. Expanded (stem expansion based on the number of data values within the stem; i.e., group by five or two as needed). d. Truncated (data is rounded before use)—optional. 8. Box plot (box-and-whisker)—teach in conjunction with measures of position. a. Single. b. Parallel (horizontal or vertical arrangement with a common scale for comparing data sets). B. Interpret the graphical display. Center, Mean, Median, Mode, Midrange. 2. Spread. Range, Variance, Standard deviation, Interquartile range (IQR). 3. Position. Median, Quartiles, Deciles, Percentiles, Standard scores (z-scores). 4. Shape. Symmetric, Skewed. 5. Outliers. Bivariate data and scatter plots. A. Construct a scatter plot from given data. B. Describe the shape of a scatter plot as linear, quadratic, or exponential. C. Examine scatter plots to determine positive, negative, or no correlation. D. Find and interpret the value of the coefficient of determination, r2. E. Find and interpret the value of the correlation coefficient, r. F. Write a linear equation that represents the relationship between the variables. 1. Intuitive methods (estimate using linguini or clear ruler). 2. Linear regression using a graphing calculator or computer software. G. Make predictions (interpolate or extrapolate). H. Explain limitations of the linear model. Basic probability concepts and applications. A. Apply counting techniques to determine the number of outcomes. 1. Tree diagram. 2. Counting principle. 3. Permutations (with and without repetition). 4. Combinations. a. Pascal’s triangle and binomial coefficients. b. Committees as subgroups of larger group. B. Determine and display a sample space. 1. List. 2. Chart. 3. Picture. 4. Tree diagram. C. Compute and display classical (theoretical) and empirical (experimental) probability. 1. Simple. 2. Complementary. a. Compound. b. Mutually exclusive (disjoint) events. c. Inclusive (joint) events. d. Independent events. e. Dependent events. 4. Conditional probability. 5. Venn diagrams and/or two-way tables to illustrate simple, complementary, compound, and conditional probability. D. Conduct and interpret simple probability experiments. V. VI. VII. VIII. VIII. 1. Manipulatives (e.g., spinners, dice, cards, coins). 2. Simulations (using random number tables, graphing calculators, or computer software). Probability distributions. A. Construct a classical (theoretical) probability distribution using a sample space. B. Construct an empirical (experimental) probability distribution using simulation. C. Compare classical (theoretical) probabilities from the sample space to the empirical (experimental) probabilities from a simulation. D. Calculate the mean, variance, and expected value of a discrete random variable. E. Contingency or two-way tables 1. Display variables in a two-way table. F. Calculate marginal distributions in a two-way table. G. Find the exact probability of a specific number of trials from a binomial experiment. H. Find the mean, variance, and standard deviation for the variables of a binomial distribution. I. Find the probabilities for outcomes of variables using other distributions such as geometric and Poisson (optional). Statistical inference. A. Identify the properties of a normal distribution and apply the empirical rule to data displaying a normal distribution. B. Find the area under the standard normal curve given various z values and vice versa. C. Find the probability for a normally-distributed variable by transforming it into a standard normal variable and vice versa. D. Use the central limit theorem to solve problems involving sample means for large and small samples. E. Use the normal approximation to compute probabilities for a binomial variable. F. Find the confidence interval for the mean with a known or unknown standard deviation for small and large sample sizes. Find the confidence interval for a population proportion. Hypothesis testing. A. Write null and alternative hypotheses. B. Find critical values for testing a mean or proportion against the population mean or proportion using the appropriate test, based on the sample size. C. Find critical values for testing the difference between two means or two proportions using the appropriate test, based on the sample size. D. Test hypotheses using confidence intervals. E. Test observed values versus expected values using the chi-square test. Project design. 1. Validity of Statistical Studies 2. Given a published report based on data, determine: a. Design of the study b. Appropriateness of the data analysis c. Validity of the conclusions d. Interpretation of results B. Use any of the statistical and probability knowledge to design a culminating project. 1. Experiments. 2. Observational studies. 3. Surveys. C. Collect, analyze, and display the data. D. Produce a report. GRADING POLICY Grades will be based on total points. Scale: A = 93 – 100 D = 70 – 76 B = 85 – 92 F = below 70 C = 77 – 84 All tests and quizzes are comprehensive. Final Grade: 1st and 2nd Quarters = 40% each Final Exam = 20% MANAGEMENT PLAN In addition to the Charleston County School District Student Code of Conduct, and the West Ashley High School General Rules (in the Student Agenda), students must comply with the following rules. RULES CONSEQUENCES 1. Have your book, notebook, and pencil; and be in 1. Verbal warning your assigned seat when the bell rings. 2. Parent phone call 2. Respect yourself, others, and your school; 3. 30-minute detention* both in language and actions. 4. Referral to an 3. Listen and follow directions the first time they administrator are given . Any severely disruptive or 4. Stay in your seat unless you have permission inappropriate behavior will to do otherwise. Result in an immediate administrator referral. *Detention will be held from 2:15-2:45 P.M. in my room with at least a 24-hour notice. Failure to show up for a detention results in a one hour detention the following day. Failure to show up for two detentions results in a referral. POSITIVE CONSEQUENCES may be in the form of verbal praise, a phone call home, e-mail, comments on progress reports and/or report cards, or a note mailed home. The WAHS Tardy and Cutting Class Policies will be enforced. I am looking forward to an exciting and rewarding semester. If you have any questions or concerns please contact me as soon as possible so we can work together to help your student succeed. The best time to contact me is during my planning period which is from 7:15 to 8:45 or after school between 2:15 and 3:00. Thank you, Have your parent or guardian complete the information below and return it by Friday, August 20th for full credit of 25 points for a quiz grade. Print parent or guardian name (first and last): Sign Parent or guardian name (first and last): 1st contact phone number: 2nd contact phone number: email address (if you have one):